Simplifying (8/27)^(2/3) in Radical Form
This expression involves fractional exponents, which can be rewritten using radicals. Let's break down the steps:
Understanding Fractional Exponents
The fractional exponent (2/3) indicates both a power and a root:
 The numerator (2) represents the power to which the base is raised.
 The denominator (3) represents the root to be taken.
Therefore, (8/27)^(2/3) can be rewritten as: (∛(8/27))^2
Simplifying the Radical

Find the cube root of 8/27: ∛(8/27) = 2/3 (Since 2 x 2 x 2 = 8 and 3 x 3 x 3 = 27)

Square the result: (2/3)^2 = 4/9
Final Answer
Therefore, (8/27)^(2/3) expressed in radical form is 4/9.